Quadratic residues and quartic residues modulo primes (1810.12102v8)

Published 22 Oct 2018 in math.NT

Abstract: In this paper we study some products related to quadratic residues and quartic residues modulo primes. Let $p$ be an odd prime and let $A$ be any integer. We mainly determine completely the product $$f_p(A):=\prod_{1\le i,j\le(p-1)/2\atop p\nmid i^{2-Aij-j^{2}(i^{2-Aij-j^2)$$}}} modulo $p$; for example, if $p\equiv1\pmod4$ then $$f_p(A)\equiv\begin{cases}-(A^{2+4)^{{(p-1)/4}\pmod}} p&\text{if}\ (\frac{A^2+4}p)=1, \(-A^{2-4)^{{(p-1)/4}\pmod}} p&\text{if}\ (\frac{A^{2+4}p)=-1,\end{cases}$$} where $(\frac{\cdot}p)$ denotes the Legendre symbol. We also determine $$\prod^{{(p-1)/2}_{i,j=1\atop} p\nmid 2i^{2+5ij+2j^{2}\left(2i^{2+5ij+2j^2\right)}}} \ \text{and}\ \prod^{{(p-1)/2}_{i,j=1\atop} p\nmid 2i^{2-5ij+2j^{2}\left(2i^{2-5ij+2j^2\right)$$}}} modulo $p$.